π-domains, overrings, and divisorial ideals

D. D. Anderson

doi:10.1017/S001708950000361X

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In this paper we study several generalizations of the concept of unique factorization domain. An integral domain is called a π-domain if every principal ideal is a product of prime ideals. Theorem 1 shows that the class of π-domains forms a rather natural subclass of the class of Krull domains. In Section 3 we consider overrings of π-domains. In Section 4 generalized GCD-domains are introduced: these form an interesting class of domains containing all Prüfer domains and all π-domains.

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Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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π-domains, overrings, and divisorial ideals

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